Esta página contiene la bibliografía recomendada y enlaces a algunos sitios
de la red internet a través de los cuales se puede conseguir información
relacionada con temas de álgebra conmutativa.
Bibliografía
- Atiyah, M.F & Macdonald, I.G., Introduction to Commutative Algebra, Addison-Wesley, Reading,1969.
- Bourbaki, N., Commutative Algebra, Addison-Wesley, Massachusetts, 1972.
- Gilmer, R., Multiplicative Ideal Theory, Marcel Dekker, New York, 1972.
- Kaplansky, I., Commutative Rings, Allyn- Bacon, Boston, 1970.
- Kunz, E., Introduction to Commutative Algebra and Algebraic Geometry, Birkhauser Boston, 1985.
- Lezama, O. & Rodriguez, G., Anillos Módulos y Categorias, Universidad Nacional de Colombia, Bogotá, 1994.
- Matsumura, H., Commutative Ring Theory, Cambridge University Press, Cambridge, 1986.
- Rocuts, S., Dominios de Prüfer: Caracterizaciones Subclases y Ejemplos, Tesis de Grado, Universidad Nacional de Colombia, Bogotá, 1999.
- Rotman, J.J., An Introduction to Homological Algebra, Academic Press, Orlando, 1979.
- Spindler, K., Abstract Algebra with Aplications, Vol I and II, Marcel Dekker, New York, 1994.
- Zariski, O. & Samuel, O., Commutative Algebra, Vol. I, D. Van Nostradand Company, New Jersey, 1958.
- Kasch, F. Modules and rings. Academic Press. London Mathematical Society. Monograph No. 17. Londres. 1982.
- Lambek, J., Lectures of rings and modules. Blaisdell Publishing Company. United States of America. 1996.
- Fontana, M., Huckaba, J.A & Papick, I., Prüfer Domains, Marcel Dekker, New York, 1997.
- Lang, S., Algebra, Springer, 2002.
| Gente |
Historia |
Revistas |
Software |
Libros y
Cursos |
|
|
|
|
|
|
 ESTADOS UNIDOS
|
Nombre y dirección electrónica
|
Áreas de interés
|
Institución
|
Sarah
Glaz
glaz@uconnvm.uconn.edu |
Álgebra Conmutativa |
University of
Connecticut |
Stefania Gabelli
gabelli@mat.uniroma3.it |
Álgebra Conmutativa |
Università degli Studi "Roma Tre"
|
Marco Fontana
mailto:fontana@mat.uniroma3.it |
Álgebra Conmutativa |
Università degli Studi "Roma Tre"
|
Leonard
Phil
pal@math.la.asu.edu |
Álgebra, teoría de números |
Arizona State
University |
H.
Pat Goeters
goetehp@mail.auburn.edu |
Grupos abelianos, módulos, anillos conmutativos |
Auburn
University |
Overtoun
Jenda
jendaov@mail.auburn.edu |
Teoría de módulos, álgebra conmutativa |
Auburn
University |
David Buchsbaum
buchsbaum@binah.cc.brandeis.edu |
Álgebra conmutativa, álgebra homológica, teoría
de representación |
Brandeis
University |
Paul Monsky
monsky@binah.cc.brandeis.edu |
Teoría de números, álgebra conmutativa, geometría
algebraica |
Brandeis
University |
Thomas
McKenzie
mckenzie@bradley.bradley.edu |
Álgebra conmutativa, teoría algebraica de números |
Bradley
University |
Larry
Xue
lxue@bradley.bradley.edu |
Teoría de anillos |
Bradley
University |
David Arnold
David_Arnold@Baylor.edu |
Grupos abelianos, anillos y módulos |
Baylor
University |
Dugas Manfred
Manfred_Dugas@Baylor.edu |
Grupos abelianos, anillos y módulos |
Baylor
University |
Ali M. Shafqat
sali@csulb.edu |
Álgebra |
California
State University at Long Beach |
Howard B. Beckwith
beckwith@csulb.edu |
Álgebra |
California
State University at Long Beach |
Linda Hyeja Byun
lhbyun@csulb.edu |
Teoría de anillos |
California
State University at Long Beach |
Robert R. Wilson
rrwilson@csulb.edu |
Álgebra, Lógica, matemática computacional |
California
State University at Long Beach |
Arthur Wayman
away@csulb.edu |
Álgebra |
California
State University at Long Beach |
James
S. Okon
jokon@wiley.csusb.edu |
Álgebra conmutativa |
California
State University, San Bernardino |
J.
Paul Vicknair
jvicknair@wiley.csusb.edu |
Álgebra conmutativa |
California
State University, San Bernardino |
L.
K. Luedeman
lued@clemson.edu |
Teoría de anillos y módulos, semigrupos |
Clemson
University |
David
C. Lantz
lantz@math.colgate.edu |
Álgebra |
Colgate University |
Frank
DeMeyer
demeyer@math.colostate.edu |
Teoría de anillos, geometría algebraica |
Colorado
State University |
David
Bayer
bayer@math.columbia.edu |
Geometría algebraica, álgebra conmutativa combinatoria |
Columbia
University |
Irena
Peeva
irena@math.cornell.edu |
Álgebra conmutativa, geometría algebraica, topología
algebraica |
Cornell University |
R.
Keith Dennis
dennis@math.cornell.edu |
Álgebra conmutativa y no conmutativa, K-teoría
algebraica |
Cornell University |
James Brewer
brewer@fau.edu |
Álgebra y teoría del control |
Florida Atlantic
University |
Lee
Klingler
klingler@fau.edu |
Álgebra |
Florida Atlantic
University |
Timothy Ford
ford@fau.edu |
Álgebra |
Florida Atlantic
University |
Robert
Gilmer
gilmer@math.fsu.edu |
Anillos conmutativos, teoría de ideales y módulos
sobre anillos conmutativos, dominios de Prüfer |
Florida State
University |
Joe
L. Mott
mott@math.fsu.edu |
Álgebra conmutativa |
Florida State
University |
Sam
Huckaba
huckaba@math.fsu.edu |
Álgebra conmutativa |
Florida State
University |
David
Eisenbud
de@msri.org |
Álgebra conmutativa, álgebra computacional,
geometría algebraica |
Mathematical
Sciences Research Institute |
Christel
Rotthaus
rotthaus@math.msu.edu |
Álgebra conmutativa |
Michigan State
University |
Alberto
Corso
corso@math.msu.edu |
Álgebra conmutativa, Álgebra computacional |
Michigan
State University |
Bernd
Ulrich
ulrich@math.msu.edu |
Álgebra conmutativa |
Michigan State
University |
Christel
Rotthaus
rotthaus@math.msu.edu |
Álgebra conmutativa |
Michigan State
University |
David
Finston
dfinston@nmsu.edu |
Álgebra conmutativa, geometría algebraica, álgebras
no asociativas |
New Mexico
State University |
Laubenbacher
Reinhard
reinhard@nmsu.edu |
Álgebra conmutativa computacional, teoría de
módulos, K-teoría |
New Mexico
State University |
Irena
Swanson
iswanson@nmsu.edu |
Álgebra conmutativa, geometría algebraica |
New Mexico
State University |
James
Coykendall
coykenda@plains.nodak.edu |
Álgebra conmutativa |
North
Dakota State University |
Joseph
Brennan
brennan@plains.nodak.edu |
Álgebra conmutativa, Álgebra computacional |
North
Dakota State University |
Bruce
Olberding
maolberding@alpha.nlu.edu |
Álgebra conmutativa |
Northeast Lousiana
University |
Janet
M. McShane
Janet.McShane@nau.edu |
Álgebra conmutativa, teoría de invariantes,
teoría de grupos |
Northern Arizona
University |
Anthony
Iarrobino
iarrobin@neu.edu |
Anillos conmutativos, geometría algebraica |
Northeastern
University |
Jerzy
Weyman
weyman@neu.edu |
Álgebra conmutativa, geometría algebraica |
Northeastern
University |
Alan
Loper
lopera@math.ohio-state.edu |
Álgebra conmutativa |
Ohio
State University-Newark |
William
J. Heinzer
heinzer@math.purdue.edu |
Álgebra conmutativa |
Purdue
University |
Luchezar
L. Avramov
avramov@math.purdue.edu |
Álgebra conmutativa |
Purdue
University |
Srikanth
Iyengar
iyengar@math.purdue.edu |
Álgebra conmutativa |
Purdue
University |
Wolmer
V. Vasconcelos
vasconce@math.rutgers.edu |
Álgebra conmutativa |
Rutgers University |
Daniel
D. Anderson
dan-anderson@uiowa.edu |
Álgebra conmutativa |
The University
of Iowa |
Louis
Dale
ldale@uab.edu |
Álgebra, teoría de anillos |
Uniersity
of Alabama at Birmingham |
Warren
May
may@math.arizona.edu |
Módulos sobre anillos conmutativos, grupos abelianos |
University
of Arizona |
David
E. Rush
rush@math.ucr.edu |
Álgebra Conmutativa |
University
of California, Riverside |
Louis
J. Ratliff
ratliff@math.ucr.edu |
Álgebra conmutativa |
University
of California, Riverside |
Adrian
R. Wadsworth
arwadsworth@ucsd.edu |
Álgebra conmutativa |
University of
California, San Diego |
John
J. Wavrik
jwavrik@math.ucsd.edu |
Álgebra conmutativa |
University of
California, San Diego |
Julius
Zelmanowitz
julius@math.ucsb.edu |
Anillos y módulos |
University
of California, Santa Barbara |
Adil
Yaqub
yaqub@math.ucsb.edu |
Teoría de anillos |
University
of California, Santa Barbara |
David
F. Anderson
anderson@novell.math.utk.edu |
Álgebra conmutativa |
University
of Tennessee |
David Dobbs
dobbs@novell.math.utk.edu |
Álgebra conmutativa |
University
of Tennessee |
Evan
G. Houston
eghousto@email.uncc.edu |
Álgebra conmutativa |
University
of North Carolina, Charlotte |
Roger
A. Wiegand
rwiegand@math.unl.edu |
Álgebra conmutativa |
University
of Nebraska, Lincoln |
Sylvia
M. Wiegand
swiegand@math.unl.edu |
Álgebra conmutativa |
University
of Nebraska, Lincoln |
Thomas
G. Lucas
tglucas@math.uncc.edu |
Álgebra conmutativa |
University
of North Carolina at Charlotte |
William
W. Smith
wwsmith@math.unc.edu |
Álgebra conmutativa |
University
of North Carolina at Chapel Hill |
Ian
Aberbach
aberbach@math.missouri.edu |
Álgebra conmutativa |
University
of Missouri |
Dale
Cutkosky
dale@math.missouri.edu |
Algebraic Geometry |
University
of Missouri |
Mel
Hochster
hochster@math.lsa.umich.edu |
Álgebra conmutativa |
University
of Michigan |
Craig
Huneke
huneke@math.ukans.edu |
Álgebra conmutativa |
University
of Kansas |
Daniel
Katz
dlk@math.ukans.edu |
Álgebra conmutativa |
University
of Kansas |
Andrew
Kustin
kustin@math.sc.edu |
Álgebra conmutativa, geometría algebraica |
University of South
Carolina |
Tom
Marley
tmarley@math.unl.edu |
Álgebra conmutativa |
University
of Nebraska, Lincoln |
Matthew
Miller
miller@math.sc.edu |
Álgebra conmutativa |
University of South
Carolina |
Hema
Srinivasan
hema@math.missouri.edu |
Álgebra conmutativa |
University
of Missouri |
Bernd
Sturmfels
bernd@math.berkeley.edu |
Algebra computacional, geometría algebraica |
University
of California,
Berkeley |
Alex
Tchernev
tchernev@math.missouri.edu |
Álgebra conmutativa |
University
of Missouri - Columbia |
Uli
Walther
walther@math.umn.edu |
Álgebra conmutativa |
University
of Minnesota |
Hara
Charalambous
hara@math.albany.edu |
Álgebra conmutativa |
University
at Albany, SUNY |
- Software
-
|
Nombre y descripción del paquete
|
System Overview:
Below you may find some information about
the design of CoCoA and some of its strong points.
The strong points of CoCoA 3:
With our system we basically do operations
over commutative rings of polynomials. For example
we may compute:
Gröbner bases and syzygies
minimal free resolutions
intersections and divisions
limination of indeterminates
homogenization
Poincaré series and Hilbert functions
factorization of polynomials
toric ideals
In addition, the capabilities of the system and the flexibility
of its use are greatly enhanced by the high-level original
programming language CoCoAL, which allows the user to
code his own algorithms in a straightforward way. Most
of the algorithms implemented in CoCoA are new and have
proved to be very efficient.
The design of CoCoA 3
The architecture of CoCoA 3 is designed
to offer flexibility through efficiency, portability,
and programmability. It runs on the following platforms:
Unix (SunOS, Solaris, Digital Unix)
Macintosh (MacOS)
PC (DOS, Windows95, Linux)
Most of the code is platform independent;
the kernel is written in the C language and a library
is written in CoCoAL, the high-level language of the system.There
are three main components: User Interface, Engine, and
Math.There are different interfaces for different machines
and each one interacts with the system using a Low Level
Protocol (LLP), which is platform independent. Engine
is the main motor: it includes the interpreter of the
CoCoAL language
which allows it to exchange LLP-inputs and LLP-outputs
with the interface. Requests of computations are forwarded
by Engine to Math, which contains all the mathematical
algorithms to manipulate coefficients, polynomials, ideals,
modules and so on. Among the various items of documentation
of the system a comprehensive online help is included
starting from the release 3.4.
|
|
